A student was investigating the difference in wavelength of a bass guitar and a whistle. The student noticed that the frequency of the whistle was high, and the bass guitar had a low frequency. Given the students' information and the model below, what is the difference in wavelength for each instrument and explain how frequency affects the wavelength?
summarize this
The model presented in the question is the relationship between frequency and wavelength.
The frequency of a sound wave refers to the number of cycles (vibrations) the wave completes per unit of time. It is typically measured in Hertz (Hz).
The wavelength, on the other hand, refers to the distance between two consecutive points of the wave that are in phase. It is usually measured in meters (m) or other length units.
According to the student's observation, the whistle has a high frequency and the bass guitar has a low frequency.
Based on the model, there is an inverse relationship between frequency and wavelength. This means that as the frequency increases, the wavelength decreases, and vice versa.
Therefore, since the whistle has a high frequency, it will have a relatively shorter wavelength compared to the bass guitar.
In summary, the difference in wavelength between the bass guitar and the whistle can be attributed to their difference in frequency. The whistle's high frequency results in a shorter wavelength, while the bass guitar's low frequency results in a longer wavelength.